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• SOLVE uses Newton's Method, so even if there are multiple
solutions, only one of them will be returned.
• Newton's Method can have problems obtaining solutions for the
following types of functions.
- A periodic function (
- A function whose graph includes a steep slope
e x
y
y
(
=
,
- A discontinuous function (
Solution Screen Contents
Solution
variable
• The "(left side) – (right side) form result" shows the result when the
obtained solution is assigned to the solution variable. The closer
this value is to zero, the higher is the precision of the obtained
solution.
Continue Screen
SOLVE performs convergence a preset number of times. If it cannot
find a solution, it displays a confirmation screen that shows "Continue:
[=]", asking if you want to continue.
Press = to continue or A to cancel the SOLVE operation.
Appendix
<#017> Solve
x
= 2, 3, 4, 5 when
*1 Assigns 3 to Y.
*2 Assigns an initial value of 1 to X.
y
= sin(
x
=1/
, etc.)
Input equation
2
y
x
x
=
–
+ 1 for
x
), etc.)
y
x
= '
, etc.)
Math
(left side) – (right side) form result
x
y
when
= 3, 7, 13, and 21. (Solutions:
y
= 3, 7, 13, 21 respectively)
E-31
Solution
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